
\documentclass[reqno]{amsart}

\AtBeginDocument{{\noindent\small
{\em Electronic Journal of Differential Equations},
Vol. 2003(2003), No. 99, pp. 1--18.\newline
ISSN: 1072-6691. URL: http://ejde.math.txstate.edu or http://ejde.math.unt.edu
\newline ftp ejde.math.txstate.edu  (login: ftp)}
\thanks{\copyright 2003 Texas State University-San Marcos.}
\vspace{9mm}}

\begin{document}

\title[\hfilneg EJDE--2003/99\hfil Qualitative properties of solutions \dots]
{Qualitative properties of solutions for quasi-linear elliptic equations}

\author[Zhenyi Zhao\hfil EJDE--2003/99\hfilneg]
{Zhenyi Zhao}

\address{Department of Mathematical Sciences
Tsinghua University,
Beijing, 100084, China}
\email{zhaozhenyi@tsinghua.org.cn}


\date{}
\thanks{Submitted May 29, 2003. Published September 25, 2003.}
\subjclass[2000]{35J15, 35J25, 35J60}
\keywords{Quasi-linear elliptic equations, comparison Principle,
\hfill\break\indent
boundary blow-up solutions, moving plane method, sliding method,
symmetry of solution}


\begin{abstract}
 For several classes of functions including the
 special case $f(u)=u^{p-1}-u^{m}$, $m>p-1>0$, we obtain Liouville
 type, boundedness and symmetry results for solutions of the
 non-linear $p$-Laplacian problem $-\Delta_{p}u=f(u)$ defined on
 the whole space $\mathbb{R}^n$.  Suppose $u \in C^{2}(\mathbb{R}^{n})$
 is a  solution. We have that  either
 (1) if $u$ doesn't change sign, then  $u$ is a constant
 (hence, $u\equiv 1$ or $u\equiv0$ or $u\equiv-1$);  or
 (2) if $u$ changes sign, then $u\in L^{\infty}(\mathbb{R}^{n})$,
 moreover $|u|<1$ on $\mathbb{R}^{n}$; or
 (3) if $|Du|>0$ on $\mathbb{R}^n$ and the  level set $u^{-1}(0)$ lies
 on one side of a hyperplane and touches  that hyperplane, i.e.,
 there exists $\nu \in S^{n-1}$ and  $x_{0}\in u^{-1}(0)$ such that
 $\nu \cdot (x-x_{0})\geq 0$ for all $x\in u^{-1}(0)$, then $u$ depends
 on one variable only (in the  direction of $\nu$).
\end{abstract}

\maketitle

\numberwithin{equation}{section}
\newtheorem{thm}{Theorem}[section]
\newtheorem{lem}[thm]{Lemma}


\section{Introduction}\label{ev1}

In this paper we consider the problem
\begin{equation}
\begin{gathered}
   -\Delta_{p}u=f(u)       \quad\text{in $\Omega$} \\
   u>0                   \quad\text{in $\Omega$} \\
   u=0                   \quad\text{on $\partial \Omega$},
\end{gathered}
\end{equation}
where $\Delta_{p}$ denotes the $p$-Laplacian operator
$\Delta_{p}=\mathop{\rm div}(|Du|^{p-2}Du)$, $p>1$, $\Omega=\mathbb{R}^{N},N\geq 2$, and
$f(u)$ is locally Lipschitz continuous.

In the case $p=2$, several results have been obtained starting
with the famous paper by Gidas, Ni and Nirenberg \cite{GNN} where,
among other things, it is proved that, if $\Omega$ is a ball and
$p=2$, solutions of (1.1) are radially symmetric and strictly
radially decreasing. This paper had a big impact not only in
virtue of the several monotonicity and symmetry results that it
contains, but also because it brought to attention the moving
plane method which, since then, has been largely used in many
different problems. This method, which is essentially based on
maximum principles, goes back to Alexandrov \cite{A} and was first
used by Serrin in \cite{S}. The moving plane method has been
improved and simplified by Berestycki and Nirenberg in \cite{BN}
with the aid of the maximum principle in small domains. Recently,
In a series papers, Berestycki, Caffarelli and
Nirenberg \cite{BCN1,BCN2,BCN3} began to study the
qualitative properties of solutions when $\Omega$ is unbounded,
for example slab, half plane, and $\mathbb{R}^{n}$.


 When $\Omega = \mathbb{R}^{n}$, it is related to the following
conjecture of De Giorgi \cite{DG}: If $u$ is a solution of the
scalar Ginzburg-Landau equation
$$
\Delta{u}+u(1-u^{2})=0 \quad \text{on $\mathbb{R}^{n}$}
$$
such that $|u|\leq 1$ and $\partial_{n}u>0$ on $\mathbb{R}^{n}$, and
$$
\lim_{x_{n}\rightarrow \pm \infty} u(x',x_{n})=\pm1,\forall x\in
\mathbb{R}^{n-1}
$$
then all level sets of u are hyperplanes, at least for $n \leq 8$.
Here $\partial_{n} u$ denotes the partial derivative of $u$ with
respect to $x_{n}$, the last component of $x$, and $x'$ denotes
the first $n-1$ components of $x$. When $n=2$, this conjecture was
completely resolved by Ghoussoub and Gui \cite{GG}. When $n=3$, it
was very recently proved by Ambrosio and Cabre \cite{AC}. Both
solutions of the conjecture are based on a Liouville-type theorem
due to Berestycki,Caffarelli and Nirenberg \cite{BCN3}. The first
partial answer to the De Giorgi conjecture is from the work of
1980 by Modica and Mortola \cite{MM}. In 1985, Modica \cite{M} found
a pointwise gradient bound for all bounded solutions. This
estimate was further generalized by Caffarelli, Garofalo and
Segala \cite{CGS} to more general nonlinear partial differential
equations which include the p-Laplacian. Under more assumptions on
the solutions, for example, if $u(x)=u(x',x_{n})\rightarrow \pm 1$
as $x_{n}\rightarrow \pm \infty$ holds uniformly for $x' \in
\mathbb{R}^{n-1}$, the conclusion of this conjecture was confirmed in
 \cite{BBG, BHM, F} for any $n\geq 2$. The
conjecture in its original form however, remains open for $n>3$.
We refer to \cite{AAC} for a fuller account of the history and
progress about this conjecture. Du and Ma \cite{DM1} recently
removed the boundedness condition $|u|\leq 1$ in De Giorgi's
conjecture. This point has already been observed by
Farina \cite{F}, but his conclusion does not seem to include those
nonlinearities covered by Du and Ma's result.

 Very little is known about the monotonicity and symmetry of
solutions of (1.1) when $p \ne 2$. In this case the solutions can
only be considered in a weak sense since, generally they belong to
the space $C^{1,\alpha}(\Omega)$(See \cite{DB} and \cite{T}).
Anyway this is not a difficulty because the moving plane method
method can be adapted to weak solutions of strictly elliptic
problems in divergence form(See \cite{D} and \cite{Da}).

 The real difficulty with problem (1.1), for $p\ne 2$, is that
the $p$-Laplacian operator is degenerate in critical points of the
solutions, so that comparison principle(which could substitute the
maximum principles in order to use the moving plane and sliding
method when the operator is not linear) are not available in the
same as for $p=2$. Actually counterexamples both to validity of
comparison principles and to the symmetry results are
available(see \cite{Br})for any $p$ with different degrees of
regularity of $f$.

 A first step towards extending the moving plane method to
solutions of problems involving the $p$-Laplacian operator has
been done in \cite{Da}. In that paper the author mainly proves
some weak and strong comparison principles for solutions of
differential inequalities involving the $p$-Laplacian. Using these
principles he adapts the moving plane method to solutions of (1.1)
getting some monotonicity and symmetry results in the case
$1<p<2$. The symmetry result is not complete and relies on the
assumption that the set of the critical points of $u$ does not
disconnect the caps which are constructed by the moving plane
method. In \cite{DP1} the author got monotonicity and symmetry for
solutions $u$ of (1.1) in smooth domains in the case $1<p<2$
without extra assumptions on $u$.


 We now state the main results.We restrict our attention on
the following equation
\begin{equation}
\Delta_{p}u+u^{p-1}-u^{m}=0,  \quad \text{on $\mathbb{R}^{n}$}
\end{equation}
where $m>p-1>0$.

\begin{thm}[Liouville Type Property]
Suppose $u \in C^{2}(\mathbb{R}^{n})$ is a solution of (1.2).
Furthermore $u$ doesn't change sign. Then $u$ is a constant
(hence,$u\equiv1$,or $u\equiv0$,or $u\equiv-1$).
\end{thm}

\begin{thm}[Global Boundedness]
 Suppose $u\in C^{2}(\mathbb{R}^{n})$ is a
changing-sign solution of (1.2). Then $u\in L^{\infty}(\mathbb{R}^{n})$,
moreover $|u|<1$ on $\mathbb{R}^{n}$.
\end{thm}

\begin{thm}[One-dimensional Property]
Suppose that $u\in C^{2}(\mathbb{R}^{n})$ solves (1.2) on $\mathbb{R}^{n}$
and $|Du|>0$. If $u^{-1}(0)$
lies on one side of a hyperplane and touches that hyperplane,
i.e., there exists $\nu \in S^{n-1}$ and $x_{0}\in u^{-1}(0)$ such
that $\nu \cdot (x-x_{0})\geq 0$ for all $x\in u^{-1}(0)$,then $u$
depends on one variable only (in the direction of $\nu$).
\end{thm}

Similar results to our Theorems 1.1 and 1.2 are obtained by Dancer
and Du \cite{DD}, Du and Gu \cite{DGu} by different methods.

Now we compare our results with the very interesting works of
P.Pucci, J.Serrin, and H.Zou \cite{PS, PSZ, SZ}. In
their papers \cite{PS, PSZ}, the aim is to find conditions
which make the Maximum Principle to be true. So they have to
assume the behavior at infinity or at some point of solutions.
Since one of our aim is to get Liouville type result, we need only
to use the Comparison Principles (see Theorem 2.1-2.4 below). In
the paper \cite{SZ}, the authors consider the radial symmetry of
the solutions with the assumption about the behavior at infinity
of the solutions. But in our Theorem 1.3, we study the one
dimensional property of solutions under different conditions of
the solutions.

Throughout this paper, for simplicity, we assume that $u\in
C^{2}(\mathbb{R}^{N})$. The rest of this paper is organized as follows.
Some preliminary results are given in section2. In section 3, we
prove Theorem 1.1. Theorem 1.2 is proved in section 4. In section 5,
we prove two lemmas which are needed in the proof of Theorem 1.3.
Theorem 1.3 is proved in section 6.


\section{Preliminary Results} \label{ev2}

In this section, we collect the related weak and  strong
comparison principles.
 Let $\Omega$ be a domain in $\mathbb{R}^{N},N\geq 2$, and let $u,v\in
C^{2}(\Omega)$ be solutions of
\begin{equation}
\begin{gathered}
     -\Delta_{p}u \leq f(u) \quad\text{in $\Omega$} \\
     -\Delta_{p}v \geq f(v) \quad\text{in $\Omega$}
\end{gathered}
\end{equation}
For a set $A \subseteq\Omega$ we define
\begin{equation}
\begin{aligned}
        M_{A}&=M_{A}(u,v)&=\sup_{A}(|Du|+|Dv|) \\
        m_{A}&=m_{A}(u,v)&=\inf_{A}(|Du|+|Dv|)
\end{aligned}
\end{equation}


 Firstly we state the weak maximum principles.

\begin{thm}[Weak Comparison Principle]
Let $u,v$ be solutions of (2.1) in a bounded domain $\Omega$ and
$f \in C[0,\infty),f(0)=0$
and $f$ is non-decreasing on some interval $[0,\delta]$. Suppose
also that $u$ and $v$ are continuous in $D$, with $v<\delta$ in
$\Omega$ and $u\geq v$ on $\partial \Omega$. Then $u\geq v$ in
$\Omega$.
\end{thm}

\begin{thm}[Weak Comparison Principle]
Let $u,v$ be respective solutions of (2.1) in D(maybe unbounded).
Suppose that $u$ and $v$ are continuous in $D$,that $m_{D}>0$,and
that $u\geq v$ on $\partial D$. Then $u\geq v$ in $D$
\end{thm}

\begin{thm}[Weak Comparison Principle]
Suppose that $1<p<2$, then there exist $\alpha,M>0$, depending on
$p$, $|\Omega|$, $M_{\Omega}$ and the $L^{\infty}$ norms of $u$ and $v$
such that: if an open set
$\Omega ' \subseteq \Omega$ satisfies
$\Omega '=A_{1}\cup A_{2},|A_{1}\cap A_{2}|=0,|A_{1}<\alpha|,M_{A_{2}}<M$
then $u\leq v$ on $\partial \Omega '$ implies $u\leq v$ in $\Omega '$
\end{thm}

For a proof,see \cite{DP2}

\begin{thm}[Weak comparison Principle]
 Suppose that $p>2$ and
$m_{\Omega}>0$,there exist $\delta,m>0$ depending on
$p,|\Omega|,m_{\Omega}$ such that the following holds: if
$\Omega'=A_{1} \cup A_{2}$ with $|A_{1}\cap A_{2}|=0,|A_{1}<\delta|$ and
$m_{A_{2}}>m$ then $u\leq v$ on $\partial \Omega '$ implies $u\leq v$ in
 $\Omega '$
\end{thm}

For a proof, see \cite{Da}
Now, we state a comparison principle in slab.

\begin{lem} Let $w$ be a function satisfying
$Lw\leq 0$ in $\Omega=\mathbb{R}^{n-1}\times (b,c)$,
where $b,c \in R$ and where
$$
Lw=\alpha_{ij}(x)\partial_{ij}w+\beta_{j}\partial _{j}u+\gamma (x)
u\,.
$$
Assume that the coefficients $\alpha_{ij}(x),\beta_{j}(x)$ are
uniformly continuous in $\overline{\Omega}$ and that the
$\alpha_{ij}$ satisfy
$$
\exists c'_{0}\geq c_{0}>0, \forall x\in \mathbb{R}^{n},\forall \xi \in
\mathbb{R}^{n},c_{0}|\xi|^{2}\leq \alpha_{ij}(x)\xi_{i}\xi_{j}\leq
c'_{0}|\xi|^{2}.
$$
Furthermore, assume that
$$
-C\leq \gamma (x) \leq0 \quad \text{for all $x\in \Omega$}
$$
for some positive real number $C$. The function $w$ is required to
be continuous in $\overline{\Omega}$ and to satisfy
$Lw \in L^{\infty}(\Omega)$
and
$m\leq w\leq M$ in $\Omega$ for some $m,M\in R$.
If $w\geq 0$ on $\partial \Omega$, then $w \geq 0$ in $\Omega$
\end{lem}

 For the proof of this lemma, we can refer to Lemma 3.1 of \cite{BHM}.
From the maximum principle, we can get the following comparison
result.

\begin{thm}
Let $f$ be a Lipschitz-continuous function,
non-increasing on the intervals $[-1,-1+\delta]$ and $[1-\delta,1]$ for some
$\delta>0$. Assume that $u_{1},u_{2}$ are solutions of
$$
\Delta_{p}u_{i}+f(u_{i})=0 \quad \text{in $\Omega$}
$$
and are such that $|u_{i}|\leq 1(i=1,2)$. Furthermore, assume that
$$
u_{2}\geq u_{1} \quad \text{on $\partial \Omega$}
$$
and that either
$u_{2}\geq 1-\delta$ in $\Omega$
or
$u_{1}\leq -1+\delta$ in $\Omega$,
Where $\Omega=\mathbb{R}^{n-1} \times (b,c)$. Then $u_{2}\geq u_{1}$.
\end{thm}


Next we deal with a form of a strong comparison theorem.First we
prove the following Harnack type comparison inequality

\begin{lem}[Harnack type comparison inequality]
Suppose $u,v$ satisfy
\begin{equation}
-\mathop{\rm div}A(x,Du)+\Lambda u \leq -\mathop{\rm div}(x,Dv)+\Lambda v,u\leq v
\quad \text{in $\Omega$}
\end{equation}
where $\Lambda \in \mathbb{R}$ and $u,v\in W^{1,\infty}_{\rm loc}(\Omega)$ if
$p\ne 2$;$u,v\in W^{1,2}_{\rm loc}(\Omega)$ if $p=2$. Suppose
$\overline{}{B(x,5\delta)}\subseteq \Omega$ for some $\delta >0$
and,if $p\neq 2,\inf_{D}(|Du|+|Dv|)>0$. Then, for any positive
number $s< \frac{n}{n-2}$ we have
$$
\|v-u\|_{L^{s}(B(x,2\delta))}\leq c\delta^{N/2}
\inf_{B(x,\delta)}(v-u)
$$
where $c$ is a constant depending on $N,p,s,c_{2},\delta$ and, if
$p\neq 2$, also on  $m=\inf_{B(x,5\delta)}(|Du|+|Dv|)$ and
$M_{B(x,5\delta)}$
\end{lem}

This lemma implies the following strong comparison principle:

\begin{thm}
Let $u,v\in C^{2}(\Omega)$ be solutions of (2.1)with $1<p<\infty,0<u\leq
v$in $\Omega$ and $f$ be locally Lipschitz-continuous in
$(0,\infty)$. Define
$$
Z^{u}_{v}=\{x\in \Omega:|Du|=|Dv|=0\} \quad (Z^{u}_{v}=\emptyset
\quad \text{for $p=2$})
$$
If there exists $x_{0}\in \Omega \setminus Z^{u}_{v}$ such that
$u(x_{0})=v(x_{0})$, then $u\equiv v$ in the connected component
of $\Omega \setminus Z^{u}_{v}$ containing $x_{0}$.
\end{thm}

For a proof, see \cite{Da}

\section{Liouville Type Property} \label{ev3}

In this section, we prove a generalization of Theorem 1.1.

\begin{thm}[Liouville Type Property]
 Let $u\in C^{2}(\mathbb{R}^{n})$ be a nonnegative solution of
$$
\Delta_{p}u+\lambda u^{p-1}-u^{m}=0 \quad \text{on $\mathbb{R}^{n}$}
$$
where $\lambda$ is positive, $p>1$ is a constant and $m>p-1$. Then
$u$ must be a constant.
\end{thm}

The basic ingredients in the proof consist of the following three
lemmas. For use in later sections and possible future
applications,these lemmas are given in much more general form than
what is required in the proof of Theorem 3.1.

We consider the problem
\begin{equation}
\Delta_{p}u+\alpha(x) u^{p-1}-\beta(x)u^{m}=0 \quad \text{on
$\mathbb{R}^{n}$}
\end{equation}
Here $p>1$ is a constant and $m>p-1$.

\begin{lem}[Comparison Principle]
Suppose that $\Omega$ is a
bounded domain in $\mathbb{R}^{N}$, $\alpha(x)$ and $\beta(x)$ are
continuous functions on $\Omega$ with $\|\alpha\|_{\infty}<\infty$
and $\beta(x)$  positive, $p>2$. Let $u_{1},u_{2}\in
C^{2}(\Omega)$ be positive in $\Omega$ and satisfy
\begin{equation}
\Delta_{p}u_{1}+\alpha(x)u_{1}^{p-1}-\beta(x)u_{1}^{m}\leq 0 \leq
\Delta_{p}u_{2}+\alpha(x)u_{2}^{p-1}-\beta(x)u_{2}^{m},x\in \Omega
\end{equation}
and $\limsup_{x\rightarrow \partial \Omega}(u_{2}-u_{1})\leq 0$,
and $\alpha(x)\leq \beta(x)$. Then $u_{2}\leq u_{1}$ in $\Omega$
\end{lem}

\begin{proof}
 Let $\varepsilon_{1}>\varepsilon_{2}>0$ and denote
$w_{i}=(u_{i}+\varepsilon_{i})^{-1}((u_{2}+\varepsilon_{2})^{2}-(u_{1}+\varepsilon_{1})^{2})_{+}(i=1,2)$.
Observe $w_{i}$ be $C^{2}$ nonnegative functions on $\Omega$ and
vanishing near $\partial \Omega$. Using (3.2), applying
integration by parts and subtracting, we obtain
\begin{equation}
\begin{aligned}
&-\int_{\Omega}[|\nabla u_{2}|^{p-2}\nabla u_{2}\nabla
w_{2}-|\nabla u_{1}|^{p-2}\nabla u_{1}\nabla w_{1}]dx \\
&\geq \int_{\Omega}\beta(x)[u_{2}^{m}w_{2}-u_{1}^{m}w_{2}]+\int_{\Omega}\alpha(x)(u_{1}^{p-1}w_{1}-u_{2}^{p-1}w_{2})
\end{aligned}
\end{equation}
Denote $\Omega_{+}(\varepsilon_{1},\varepsilon_{2})=\{x\in
\Omega:u_{2}(x)+\varepsilon_{2}>u_{1}(x)+\varepsilon_{1}\}$ and
note that the integrands in (3.3) vanishing outside this set. The
left side of (3.3) equals
\begin{equation}
\begin{aligned}
&-\int_{\Omega_{+}(\varepsilon_{1},\varepsilon_{2})}[|\nabla u_{1}
|^{p-2}|\nabla
u_{2}-\frac{u_{2}+\epsilon_{2}}{u_{1}+\varepsilon_{1}}\nabla
u_{1}|^{2}+|\nabla u_{2}|^{p-2}|\nabla
u_{1}-\frac{u_{2}+\epsilon_{2}}{u_{1}+\varepsilon_{1}}\nabla
u_{2}|^{2}]\\
&-\int_{\Omega_{+}(\varepsilon_{1},\varepsilon_{2})}(|\nabla
u_{2}|^{p-2}-|\nabla u_{1}|^{p-2})(\nabla u_{2}\nabla u_{2}-\nabla
u_{1}\nabla u_{1})dx
\end{aligned}
\end{equation}
Noting that $w_{1}>w_{2}$ in
$\Omega_{+}(\varepsilon_{1},\varepsilon_{2})$. We conclude that
the left side of (3.4) is not positive. On the other hand as
$\varepsilon_{1}\rightarrow 0$ the right side of (3.3) converges
to
$$
\int_{\Omega_{+}(0,0)}[\beta(x)(u_{2}^{m-1}-u_{1}^{m-1})-\alpha(x)(u_{2}^{p-1}-u_{1}^{p-1})](u^{2}_{2}-u^{2}_{1})
$$
while last term in (3.3) converge to $0$. Unless $\Omega_{+}(0,0)$
is empty, the limiting value of the right side of (3.3) is
positive.
Since this leads to a contradiction we conclude that $u_{2}\leq
u_{1}$in $\Omega$
\end{proof}

\begin{lem}[Locally uniformly Boundedness]
$u\in C^{2}$ is a positive solution of (3.1). Then we have the bound
$$
\max_{G}u(x)\leq c_{0}
$$
For every compact subset $G\subset \mathbb{R}^{n}$ and $c_{0}$ is a
constant.
\end{lem}

\begin{proof}
Suppose that $max_{G}u(x)=u_{x_{0}}$ for some $x_{0}\in
G$. If $|Du(x_{0})|=0$, Then $u\leq \max_{G}(\alpha(x)/\beta(x))^{m-p+1}$.
Otherwise, we may assume
that there is a ball $B_{2r}:=B_{2r}(x_{0})\subset \mathbb{R}^{n}$with
center $x_{0}\subset G$ such that
$$
\max_{\bar{G}}=\max_{B_{r}}u(x):=M(r) \quad
\mbox{and}\quad
\min_{B_{2r}}|Du|>0
$$
Since,on $B_{2r}$, we have
$$
\Delta_{p}u \geq -\alpha(x)u
$$
Then as pointed out in \cite{DM1}, $u$ locally uniformly bounded.
\end{proof}

\begin{lem}
Let $\Omega$ be a bounded domain in $\mathbb{R}^{n}$ with
smooth boundary. Suppose $\alpha$ and $\beta$ are smooth positive
functions on $\bar{\Omega}$, and let $\mu_{1}$ denote the first
eigenvalue of $-\Delta_{p}u=\mu \alpha(x)u^{p-1}$ on $\Omega$
under Dirichlet boundary conditions on $\partial \Omega$. Then the
problem
$$
-\Delta_{p}u=\mu u[\alpha (x)u^{p-2}-\beta(x)u^{m-1}],u|_{\partial
\Omega}=0
$$
has a unique positive solution for every $\mu>\mu_{1}$,and the
unique positive solution $u_{\mu}$ satisfies $u_{\mu}\rightarrow
[\alpha(x)/\beta(x)]^{1/(m-p+1)}$
\end{lem}

\begin{proof}
The existence from a simple upper and lower
solution argument. clearly any constant greater that or equal to
$M=\max_{\bar{\Omega}}[\alpha(x)/\beta(x)]^{1/(m-p+1)}$ is an upper
solution. Let $\phi$ be a positive eigenfunction corresponding to
$\mu_{1}$, then for each fixed $\mu>\mu_{1}$ and all small
positive $\epsilon,\epsilon \phi<M$ and is a lower solution. Thus
there is at least one positive solution. If $u_{1}$ and $u_{2}$
are two positive solutions, we apply comparison principle to
conclude that $u_{1}\leq u_{2}$ and $u_{2}\leq u_{1}$ both hold on
$\Omega$. Hence $u_{1}=u_{2}$. This proves the uniqueness.


 Given any compact subset $K$ of $\Omega$ and any small
$\epsilon>0$ such that
$\epsilon<\upsilon_{0}=[\alpha(x)/\beta(x)]^{1/(m-p+1)}$ on
$\Omega$, we let $\upsilon_{\epsilon}=\upsilon_{0}+\epsilon$ , and
find that
$v_{\epsilon}(\alpha(x)v_{\epsilon}^{p-2}-\beta(x)\upsilon_{\epsilon}^{m-1})\leq
-\delta$ on $\Omega$ for some positive constant
$\delta=\delta(\epsilon)$ and $-\Delta_{p}\upsilon_{\epsilon}\geq -c$ on
$\Omega$ for some positive constant $c=c(\epsilon)$. It
follows that for all large $\mu$, $\upsilon_{\epsilon}$ is an
upper solution of our problem.


 On the other hand, Let $\phi$ be the positive eigenfunction
corresponding to $\mu_{1}$ with $\|\phi\|_{\infty}=1$. then we can
find a small neighborhood of $\partial \Omega$ in $\Omega$, say
$U$, such that $\phi$ is very small in $U$ so that for all
$\mu>\mu_{1}+1,-\Delta_{p}\phi=\mu_{1}\alpha(x)\phi^{p-1} \leq
\mu\phi(\alpha(x)\phi^{p-2}-\beta(x)\phi^{m-1})$ on $U$. By
shrinking $U$ further if necessary, we can assume that
$\bar{U}\cap K =\emptyset$ and $\phi<v_{0}-\epsilon$ on $U$. Now
we can choose a smooth function $w_{\epsilon}$ on $\Omega$ such
that $w_{\epsilon}=\phi$ on $U$, $w_{\epsilon}=v_{0}-\epsilon$ on
$K$ and $v_{0}-\epsilon/2>w_{\epsilon}>0$ on the rest of $\Omega$.
It is easily seen that such $w_{\epsilon}$ is a lower solution of
our problem for all large $\mu$. since
$w_{\epsilon}<\mu_{\epsilon}$, we deduce $w_{\epsilon}\leq
u_{\mu}<\upsilon_{\epsilon}$ on $\Omega$ for all large $\mu$. In
particular,
$$
[\alpha(x)/\beta(x)]^{1/(m-p+1)}+\epsilon \geq u_{\mu}\geq
[\alpha(x)/\beta(x)]^{1/(m-p+1)}-\epsilon
$$
on $K$ for all large $\mu$. this is to say that
$u_{\mu}\rightarrow (\alpha/\beta)^{1/(m-p+1)}$ as $\mu
\rightarrow \infty$ uniformly on $K$, as required.
\end{proof}

\begin{lem}
Let $\Omega$ be an arbitrary domain in $\mathbb{R}^{n}$ and
suppose that there exists a large solution of the equation
$\Delta_{p} u=u^{m}$ in $\Omega$. Let $\Xi$ be a compact subset of
$\partial \Omega$ and let $P\in \Xi$. Suppose that,for every
$\delta>0$,there exists an open,connected neighborhood of $P$,say $Q_{P}$
with $C^{2}$ boundary, such that,
\begin{itemize}
\item $\Omega_{P}=Q_{P}\cap \Omega$ is a simply connected domain.

\item $Q_{P}\subset \Xi_{\sigma}=\{x:dist(x,\Xi)<\sigma \}$ and $\partial
\Omega \cap \bar{\Omega}_{P}=\overline{\partial \Omega\cap Q_{P}}$
\end{itemize}
 Then there exists $\delta_{0}>0$(which depends on $\Xi$ but not
on $P$) such that,if $\Omega_{P}$ is contained in
$\Xi_{\delta_{0}}$,the following statements hold.
\begin{itemize}
\item[(a)] There exists a large solution of (3.1) in $\Omega_{P}$;

\item[(b)] There exists a positive solution $v$ of (3.1) in
$\Omega_{P}$ such that
\begin{gather}
v(x)\rightarrow\infty \quad \text{locally uniformly as
$x\rightarrow \Gamma_{1}=\partial \Omega \cap Q_{P}$}\\
v\in C(\Omega_{P}\cup \Gamma_{2}) \quad \text{and $v=0$ on
$\Gamma_{2}=\Omega\cap\partial Q_{P}$}
\end{gather}
\end{itemize}
\end{lem}

\begin{proof}
(a) Let $b=2\sup_{\Omega}\beta(x)$ and let
$c=\sup\{-\alpha(x)t^{p-1}-\frac{1}{2}bt^{m}:t>0,x\in \Omega\}$.
Then, every positive solution $u$ of (3.1) satisfies
$$
\Delta_{p}u\leq bu^{m}+c
$$
Let $U$ be a large solution of $\Delta_{p}u=2bu^{m}$ in $\Omega$.
This means that $u$ is a solution of $\Delta_{p}u=2bu^{m}$ with
boundary value $u=+\infty$ on $\partial \Omega$. Let
$M=\inf\{U(x):x\in \Omega\cap\Xi\}$ and choose $\delta_{0}$
sufficiently small so that $bM^{m}\geq c$. Then
\begin{equation}
\Delta_{p} U\geq bU^{m}+c \quad \text{in $\Omega_{P}$}
\end{equation}
Let $\{ \Theta_{n}\}$ be an increasing sequence of domains with
$C^{2}$ boundary such that
\begin{equation}
\bar{\Theta}_{n}\subset \Theta_{n+1}\subset\Omega_{P}\quad \text{and}\quad
\Theta_{n}\uparrow \Omega_{P}.
\end{equation}
Let $u_{n}$ and $V$ be large solutions of (3.1) in $\Theta_{n}$
and $Q_{P}$ respectively. By comparison principle $\{u_{n}\}$ is
monotone decreasing and $u_{n}\geq V$ in $\Theta_{n}$. By the
comparison principle, (3.7) and (3.8) $u_{n}\geq U$ in
$\Theta_{n}$. Hence $\lim u_{n}$ is a large solution of (3.1) in
$\Omega_{P}$

\noindent (b) For the proof of the second statement we may assume (in view of
(a)) that there exists a large solution of (3.1) in $\Omega$. Now,
Let $\{\Theta_{n}\}$ be an increasing sequence of domain with
$C^{2}$ boundary such that,
$$
\Theta_{n}\subset \Omega_{P},\Theta_{n}\uparrow \Omega_{P} \quad
\text{and}\quad \Omega_{P}\setminus \Theta_{n} \subset K_{n}=
\{x:dist(x,\Gamma_{1})<2^{-n}\}.
$$
Denote $\Gamma_{1,n}=\partial\Theta_{n}\cap
K_{n},\Gamma_{2,n}=\partial \Theta_{n}\cap (\bar{K_{n}})^{c}$.
Thus $\Gamma_{2,n}\subset\Gamma_{2,n+1}\subset \Gamma_{2}$. We
shall also assume that the sets $\Gamma_{1,n}$ are disjoint.

 For each $n$,consider a sequence of functions
$\{\varphi_{n,k}\}_{k=1}^{\infty}$ on $\partial \Theta_{n}$
satisfying the following properties.
\begin{itemize}
\item $\varphi_{n,k}=k$ on $\Gamma_{1,n};\varphi_{n,k}=0$ for $x\in
\Gamma_{2,n}$ such that $dist(x,\Gamma_{1,n})>2^{-n}$;

\item $0\leq \varphi_{n,k}\leq k$ everywhere; $\varphi_{n,k}\in C^{2}(\partial
\Theta_{n})$;

\item $\varphi_{n,k}\geq \varphi_{n-1,k}$ on $\Gamma_{2,n}$ and
$\varphi_{n,k}\leq\varphi_{n,k-1}$ on $\partial \Theta_{n}$
\end{itemize}
 Let $v_{n,k}$ be a solution of (3.1) in $\Theta_{n}$ in
$\Theta_{n}$ such $v_{n,k}=\varphi_{n,k}$ on $\partial \Theta$. By
comparison principle $\{v_{n,k}\}_{k=1}^{\infty}$ is monotone
increasing and by Lemma 3.2 the sequence is locally bounded. Hence
$v_{n}=\lim_{k\rightarrow\infty}v_{n,k}$ is a solution of (3.1) in
$\Theta_{n}$ such that
\begin{equation}
\begin{gathered}
  v_{n}\rightarrow \infty \quad \text{as $x\rightarrow \Gamma_{1,n};v_{n}
  \in C(\Theta_{n}\cup  \Gamma_{2,n})$}\\
  v_{n}=0  \quad \text{on $\Gamma_{2,n}$}
\end{gathered}
\end{equation}
Furthermore,by their construction,$v_{n,k}\geq v_{n+1,k}$ so that
$\{ v_{n} \}$ is monotone decreasing. Consequently
$v=\lim_{n\rightarrow \infty}v_{n}$ is a solution of (3.1) in
$\Omega_{P}$. If $V$ is a large solution of (3.1) in
$Q_{P},v_{n}+V$ is a supersolution  of (3.1) in $\Theta_{n}$ which
blows up on $\partial \Theta_{n}$. Hence $v_{n}+V\geq U$, where
$U$ is a large solution of (3.1) in $\Omega$. Thus $v+V\geq U$ and
this implies (3.5) Finally by (3.9), $v$ satisfies (3.6)
\end{proof}

\begin{lem} The problem
\begin{equation}
-\Delta_{p} u=\mu u[\alpha(x)^{p-2}-\beta(x)u^{m-1}],u|_{\partial
\Omega}=\infty
\end{equation}
has a unique positive solution for each $\mu>0$, and the unique
positive solution $u_{\mu}$ satisfies $u_{\mu}\rightarrow
(\alpha/\beta)^{1/(m-p+1)}$ uniformly on any compact subset of
$\Omega$ as $\mu \rightarrow \infty$
\end{lem}

Here and throughout this paper, by $u|_{\partial \Omega}$, we mean
$u(x)\rightarrow\infty$ as $d(x,\partial \Omega)\rightarrow 0$. We
also write $x\rightarrow \partial \Omega$ when $d(x,\partial
\Omega)\rightarrow 0$.

\begin{proof}  1. Existence: The existence follows from a simple
upper and lower solution argument. Suppose $\mu>0$. For any
positive integer
$n>M=\max_{\bar{\Omega}}(\alpha/\beta)^{1/(m-p+1)}$, the problem
$$
-\Delta_{p}u=\mu u(\alpha u^{p-2}-\beta u^{m-1}),u|_{\partial
\Omega}=n
$$
has a unique positive solution. Indeed $u\equiv 0$ and $u\equiv n$
are lower and upper solution to this problem,and hence there is at
least one positive solution. By comparison principle,there is at
most one positive solution. Therefore there is a unique positive
solution. Denoting this solution by $u_{n}$, we find, by
comparison principle, that $u_{n}$ increases with $n$. By Lemma 3.3
we can find a uniform upper bound for $u_{n}$ on any compact
subset of $\Omega$, then by a standard regularity
argument,$u_{\mu}=lim_{n\rightarrow \infty}u_{n}$ would be a
positive solution of (3.10).


2. Uniqueness: Suppose that $u$ is a large solution of (3.10).
Note that for every $\epsilon>0$ there exists $\beta_{\epsilon}>0$
such that
$$
k(1-\epsilon)u^{m}\leq \Delta_{p} u\leq k(1+\epsilon)u^{m} \quad
\text{in $\{ x\in \Omega:\mathop{\rm dist}(x,\partial
\Omega)>\beta_{\epsilon}\}$}
$$
Let $P\in \partial \Omega$ and assume (as we may) that the set
$Q_{p}$ mentioned above is an open,bounded spherical cylinder
centered at $P$, with axis parallel to the $\xi_{n}$ axis. Thus,
$$
Q_{p}=\{\eta:|\eta '|<\rho_{P},|\eta_{N}|<\tau_{P}\}
$$
where $\eta=\xi-P$ and $\eta'=(\eta_{1},\dots,\eta_{N-1})$. By
appropriately choosing $\sigma_{P}$ and $\tau_{P}$ we may also
assume that $\partial \Omega$ is bounded away from the 'top' and
'bottom' of the cylinder $Q_{P}$ and that $\partial \Omega \cup
\bar{Q_{P}}=\overline{\partial \Omega\bigcap Q_{P}}$. finally we
assume that $\rho_{P}$ and $\tau_{P}$ are sufficiently small so
that Lemma 3.5 can be applied to $Q_{P}$ and so that
\begin{equation}
\begin{gathered}
k(P)(1-\epsilon)u^{m}(x)\leq\Delta_{p}u\leq
k(P)(1+\epsilon)u^{m}(x)  \\
\forall x \in \Theta =Q_{P}\cap \Omega.
\end{gathered}
\end{equation}
Therefore there exists a solution $v$ of the problem
\begin{align*}
\Delta_{p}v=v^{m} \quad \text{and $v>0$ in $\Theta=Q_{P}\cap \Omega$} \\
v(x)\rightarrow \infty \quad \text{locally uniformly as
$x\rightarrow
Q_{P}\cap \partial \Omega$} \\
v(x)\rightarrow 0 \quad \text{locally uniformly as $x\rightarrow
\partial Q_{P}\cap \Omega$}
\end{align*}
Next denote
\begin{align*}
v_{1}=(k(P)(1-\epsilon))^{-1/(m-1)}v \\
v_{2}=(k(P)(1+\epsilon))^{-1/(m-1)}v
\end{align*}
and let $w$ be the large solution of (3.10) in $Q_{P}$. We claim
that
\begin{equation}
v_{2}<u<v_{1}+w \quad \text{in $\Theta$}
\end{equation}
To verify this claim,let $\xi$ denote the unit vector parallel to
the axis of $Q_{P}$ such that $P+\xi$ is outside $\Omega$ and set
$\Theta_{\sigma}=\{x-\sigma \xi:x\in \Theta,\sigma >0\}$. If $f$
is a function defined in $\Theta$, set $f_{\sigma}(x)=f(x+\sigma
\xi)$ for $x\in \Theta_{\sigma}$. Assume that $\sigma$ is a
sufficiently small positive number so that
$\Theta_{\sigma}\subset\subset\Omega$. Then
$v_{1,\sigma}+w_{\sigma}$ is a supersolution in $\Theta_{\sigma}$
and hence $v_{1,\sigma}+w_{\sigma}>u$ there. On the other hand,
by(3.11), $v_{2,-\sigma}<u$ on $\partial(\Theta_{-\sigma}\cap
\Omega)$ and hence $v_{2,-\sigma}<u$ in $\Theta_{-\sigma}\cap
\Omega$. Thus,for $0<\sigma$ sufficiently small,
$v_{2,-\sigma}<u<u_{1,\sigma}+w_{\sigma}$ in $\Theta_{-\sigma}\cap
\sigma$ and hence,letting $\sigma$ tend to zero, we obtain
.Finally,since $w$ is bounded in every compact subset of $Q_{P}$,
it follows that
\begin{equation}
u(x)/(k(x)^{-1/(m-1)}v(x))\rightarrow 1 \quad \text{locally
uniformly as $x\rightarrow Q_{P}\cap \partial \Omega$ }
\end{equation}
Therefore if $u_{1}$ and $u_{2}$ are tow positive solutions of
(3.10) ,then
$$
\lim_{x\rightarrow \partial \Omega}u_{1}(x)/u_{2}(x)=1
$$
It follows that for any $\epsilon>0$,
$$
\lim_{x\rightarrow \partial
\Omega}[(1+\epsilon)u_{1}-u_{2}]=\infty
$$
As $(1+\epsilon)u_{1}$ is an upper solution to (3.10), we can
apply comparison principle to conclude that $(1+\epsilon)u_{1}\geq
u_{2}$ on $\Omega$. As $\epsilon >0$ is arbitrary, we deduce
$u_{2}\geq u_{1}$. Thus $u_{1}=u_{2}$ on $\Omega$. This proves the
uniqueness.


\noindent 3. Asymptotic behavior. Now we know that
the positive solution $u_{\mu}$ constructed above is the unique
positive solution. Let $K$ be an arbitrary compact subset of
$\Omega,v_{0}=(\alpha/\beta)^{1/(m-p+1)}$ and $\epsilon>0$ any
small positive number satisfying $\epsilon<v_{0}$ on $\Omega$. It
is easily seen that ,for all large
$u$,$w_{\epsilon}=v_{0}-\epsilon$ is a lower solution for the
problem satisfied by $u_{n}$ with $u_{n}>w_{\epsilon}$.

 On the other hand,fix a $\mu_{0}>0$ then we can find a small
neighborhood $U$ of $\partial \Omega$ in $\Omega$ such that
$u_{0}=u_{\mu_{0}}>v_{0}+\epsilon$ on $U$. Therefore,
$$
-\Delta_{p}u_{0}=\mu_{0}u_{0}(\alpha u_{0}^{p-2}-\beta
u_{0}^{m-1})\geq \mu u_{0}(\alpha u_{0}^{p-2}-\beta u_{0}^{m-1})
$$
on $U$ for all $\mu >\mu_{0}$. Now let us choose a smooth function
$v_{\epsilon}$ satisfying $v_{\epsilon}=u_{0}$ on
$U$,$v_{\epsilon}=v_{0}+\epsilon$ on $K$ and
$v_{\epsilon}=v_{0}+\epsilon /2$ on the rest of $\Omega$. Then it
is easily checked that $v_{\epsilon}$ is an upper solution for the
equation of $u_{n}$ provided that $\mu$ is large enough. As
$w_{\epsilon}>v_{\epsilon}$ on $\Omega$,we must have
$w_{\epsilon}\leq u_{n}\leq v_{\epsilon}$ on $\Omega$ for all
large $\mu$ and every large $n$. It follows that $w_{\epsilon}\leq
u_{\mu}\leq v_{\epsilon}$ on $\Omega$. This implies that
$u_{\mu}\rightarrow v_{0}$ on $K$ as $\mu\rightarrow \infty$, as
required. The proof of the lemma is now complete.
\end{proof}



\noindent\textbf{Remark.} In the above argument, we used the idea of
 \cite{BM}. However, our case is more complicated. We have to
overcome this difficulty.


\begin{proof}[Proof of Theorem 3.1]
Let us first observe that a nonnegative entire solution of
$\Delta_p(u)+\lambda u^{p-1}-u^{m-1}$ is either identically zero
or positive everywhere,due to the Harnack inequality. therefore,we
need only consider positive solutions.

 Set $\Omega=\{x:|Du(x)|=0\}$. if $\Omega=\mathbb{R}^{n}$,we are done. It
is easy to see that $\Omega$ is closed. Let $x_{0}$ be an
arbitrary point in $\mathbb{R}^{n}$, we will show that $u(x_{0})=\lambda
^{1/(m-p+1)}$,using only pointwise convergence of $v_{\alpha}$ and
$w_{\alpha}$.
 For  $\alpha>0$ let us define
\begin{equation}
u_{\alpha}(x)=u(x_{0}+\alpha(x-x_{0}))
\end{equation}
It easily checked that $u_{\alpha}$ satisfies
$$
\Delta_{p}u+\alpha^{p}(\lambda u^{p-1}-u^{m})
$$
Let $B$ denote the a ball with center $x_{0}$ and $B \cap
\Omega=\emptyset$. By Lemma 3.4, for large $\alpha$, the problem
$$
\Delta_{p}v +\alpha^{p}(v^{p-1}-v^{m}),v|_{\partial B}=0
$$
has a unique positive solution $v _{\alpha}$ and as $\alpha \to
\infty,v_{\alpha}\to \lambda^{1/(m-p+1)}$ at $x=x_{0}\in B$.
Applying comparison principle we see that $u_{\alpha}\geq
v_{\alpha}$ on $B$, and hence
$$
u(x_{0})=u_{\alpha}(x_{0})\geq v_{\alpha}(x_{0})
$$
Letting $\alpha \rightarrow \infty$ in the above inequality we
conclude that $u(x_{0})\geq \lambda ^{1/(m-p+1)}$.

 Let $w_{\alpha}$ be the unique positive solution of
$$
\Delta_{p} w+\alpha^{p}(w^{p-1}-w^{m}),w|_{\partial B}=\infty
$$
by Lemma 3.6 we know that as $\alpha\rightarrow \infty,
w_{\alpha}(x) \rightarrow \lambda^{1/(m-p+1)}$ at $x=x_{0}\in B$.
Applying comparison principle we can see that $u_{\alpha}\leq
w_{\alpha}$ on B. Thus
$$
u(x_{0})=u_{\alpha}(x_{0})\leq w_{\alpha}(x_{0})
$$
Letting $\alpha \rightarrow \infty$ we obtain $u(x_{0})\leq
\lambda ^{1/(m-p+1)}$. Therefore $u(x_{0})=\lambda
^{1/(m-p+1)}$.As $x_{0}$ is arbitrary, we conclude that $u \equiv
\lambda ^{1/(m-p+1)}$.
\end{proof}

\noindent\textbf{Remark:}
We believe this result is also true when p-Laplacian is
replaced by the MCO $\mathop{\rm div}(\frac{\nabla u}{\sqrt{1+|\nabla
u|^{2}}})$.

\section{Global Boundedness and Related Results}
\label{ev4}

In this section, we prove general result which contains Theorem 1.2
as a special case.

 Let us observe the following result for the ODE problem
\begin{equation}
u'=f(u),u(0)=u_{0}.
\end{equation}

\begin{lem} Suppose $f$ is $C^{1}$ and satisfies
$$
f(0)=f(1)=0,\quad f(u)>0\; \forall u\in (0,1),\quad f(u)<0 \;\forall u>1
$$
Then for any $u_{0}>0$, the unique solution $u(t)$ of (4.1)
satisfies $\lim _{t\rightarrow \infty}u(t)=1$.
\end{lem}

\begin{proof}
If $u_{0}=1$, we have $u(t)\equiv 1$ and there is
nothing to prove. If $0<u_{0}<1$, then $u(t)$ is increasing and
upper bounded by $1$. Therefore $\lim_{t \rightarrow
\infty}u(t)=u(\infty)$ exists and satisfies $u (\infty)\in (0,1]$.
But then $u(\infty)$ must be a positive root of $f$. Therefore
$u(\infty)=1$. The case $u_{0}>1$ follows from a similar analysis,
except that now $u(t)$ is decreasing.
\end{proof}

\begin{thm}
Let $u\in C^{2}(\mathbb{R}^{n})$ be a solution of (1.2). Then the
conclusions in Theorem 1.2 hold.
\end{thm}

\begin{proof}
Let us first observe that it suffices to show $|u|\leq 1$ in
$\mathbb{R}^{n}$. Indeed, if $|u(x_{0})|=1$ say $u(x_{0})=-1$,then,
$w:=u+1$ satisfies
$$
-\mathop{\rm div}(|\nabla w|^{p-2}\nabla u)=f(w-1),w\geq 0,w(x_{0})=0\,.
$$
Hence, it follows from the strong maximum principle that $w\equiv
0$, contradicting our assumption that $u$ changes sign.

 We now prove $|u|\leq 1$ on $\mathbb{R}^{n}$.
 Set $D=\{x:|Du(x)|=0\}$ it is easily seen that $|u|\leq 1$ on $D$. On $\mathbb{R}^{n}\setminus D$,
let $g(u)=-u^{r},p-1<r<m$, we can use the proof of Theorem 1 of
 \cite{DL} to conclude that the problem
$$
\Delta_{p}v=g(v),v|_{\partial B}=\infty
$$
has a unique positive solution $v$,where $B$ stands for a ball
centered at the origin with small radius. We claim that $u\leq
c=\min_{B}v(x)$ on $\mathbb{R}^{n} \setminus D$. Otherwise, We can find
$x_{0}\in \mathbb{R}^{n} \setminus D$ such that $u(x_{0})>c$. Define
$v(x)=v(x-x_{0})$. We find that the set $\{x\in
B(x_{0}):u(x)>v(x)\}$ has a component $\Omega$ whose closure lies
entirely in the open ball $B(x_{0})=\{x:x-x_{0}\in B\}$. On
$\Omega$, we have $u(x)>v(x)\geq c>M$ where $M$ satisfies
$-u^{r}(M)=u^{p-1}(M)-u^{m}(M)$ and $\Delta_{p}u+g(u) \geq
0=\Delta_{p}v+g(v)$. Moreover, $u=v$ on $\partial \Omega$. As
$g(u)$ is decreasing for $u>M$, from comparison principle, we
deduce that $u\equiv v$ in $\Omega$. This contradiction shows that
we must have $u\leq c$ on $\mathbb{R}^{n}$.

 Applying the above argument to $w=-u$ which satisfies
$$
\Delta_{p}w=g(w),g(w)=-f(-w),
$$
we deduce that $u \geq -c$ on $\mathbb{R}^{n}$. Therefore,
$$
-c\leq u(x),\forall x\in \mathbb{R}^{n}\setminus D.
$$
Let $u_{c}$ and $u_{-c}$ denote the unique solution of
$$
u'=f(u),\quad u(0)=u_{0}
$$
with $u_{0}=c$ and $u_{0}=-c$, respectively. Then it follows from
Lemma 4.1 that $u_{c}(t) \rightarrow 1$ and $u_{-c}(t)\rightarrow
-1$ as $t \rightarrow + \infty$. One the other hand,
$u,u_{c},u_{-c}$ are all bounded solutions of the parabolic
problem
$$
u_{t}-\mathop{\rm div}(|\nabla u|^{p-2}\nabla u)=f(u)\,.
$$
Since $u_{c}(0)\geq u(x)\geq u_{-c}(0)$ on $\mathbb{R}^{n} \setminus D$, by
the parabolic maximum principle and the boundedness of
$u,u_{c},u_{-c}$, we conclude that $u_{-c}(t)\leq u(x)\leq
u_{c}(t)$ for all $t>0$. Letting $t\rightarrow \infty$, we obtain
$-1\leq u(x) \leq 1$, as required. This finishes our proof of
Theorem 4.2.
\end{proof}

\section{Some Lemmas} \label{ev5}

In this section, we prove two lemma which are needed in the proof
of Theorem 1.3.
Consider the solutions of the problem
\begin{equation}
\Delta_{p}u+f(u)=0 \quad \text{in $\mathbb{R}^{n}$}
\end{equation}
and that satisfy $|u|\leq 1$ together with the asymptotic
conditions
\begin{gather}
u(x',x_{n})\rightarrow \pm 1 \quad \text{as $x_{n}\rightarrow \pm
\infty$ uniformly in $x'=(x_{1},\dots,x_{n-1})$},\\
|Du|>0\,.
\end{gather}
Assume that the function $f=f(u)$ is Lipschitz-continuous on $[-1,1]$,
and that there exists $\delta>0$ such that
\begin{equation}
f \quad \text{is non-increasing on $[-1,-1+\delta]$ and on
$[1-\delta,1]$}.
\end{equation}

\begin{lem}
Let $u$ be a solution of (5.1), (5.2) and (5.3) such that $|u|\leq 1$.
Then $u(x',x_{n})=u_{0}(x_{n})$
\end{lem}

The proof uses a sliding method and a version of comparison
principle in slab; i.e., Theorem 2.6.

\begin{proof}
Let us now consider a solution of (5.1), (5.2) and (5.3) such that
$|u|\leq 1$, and let $f$ satisfy (5.4). We are first going to
prove that $u$ is increasing in any direction
$v=(v_{1},\dots,v_{n})$ such that $v_{n}>0$. In order to do so, for
any $t\in R$, we define the function $u^{t}$ by
$u^{t}(x)=u(x+tv)$.

 From (5.2), there exists real $a>0$ such that
$u(x',x_{n})\geq 1-\delta$ for all $x'\in \mathbb{R}^{n-1}$ and $x_{n}\geq a$
and $u(x',x_{n}) \leq -1+\delta$ for all $x' \in \mathbb{R}^{n-1}$ and
$x_{n}\leq -a$. For any $t\geq 2a/v_{n}$, the functions $u$ and
$u^{t}$ are such that
\begin{gather*}
u^{t}(x',x_{n})\geq 1-\delta   \quad\text{for all
$x'\in \mathbb{R}^{n-1}$ and for all $x_{n}\geq -a$}, \\
u(x',x_{n})\leq -1+\delta   \quad\text{for all
$x'\in \mathbb{R}^{n-1}$ and for all $x_{n}\leq -a$}, \\
u^{t}(x',-a)\geq u(x',-a) \quad\text{for all $x'\in \mathbb{R}^{n-1}$ and for
all $x_{n}\leq -a$},
\end{gather*}
We now apply comparison principle in slabs of the type
$$
\Omega_{h}=\mathbb{R}^{n-1}\times (-a,h)
$$
with  $h>-a$.

 Due to (5.2), there exists a function $\varepsilon (h)\geq 0$
such that $u^{t}(x',h)-u(x',h)\geq -\varepsilon(h)$ for all $x'\in
\mathbb{R}^{n-1}$ and $\varepsilon(h) \rightarrow 0$ as $h\rightarrow
+\infty$. Choose any $h>-a$ and set
$$
w=u^{t}(x)+\varepsilon (h)\,.
$$
Then $w,u$ fulfill the assumption of Theorem 2.6. We have $w\geq u$ in
$\Omega_{h}$. By passing to the limit $h\rightarrow \infty$, we
conclude that
$$
u^{t}(x',x_{n})\geq u(x',x_{n}) \quad \text{for all $x'\in
\mathbb{R}^{n-1}$ and $x_{n}\geq -a$}.
$$
Similarly, we could show that
$$
u^{t} \geq u(x',x_{n})  \quad \text{for all $x'\in \mathbb{R}^{n-1}$ and
$x_{n}\leq -a$}
$$
whence $u^{t}\geq u$ in $\mathbb{R}^{n}$

 Let us now decrease $t$. We claim that $u^{t} \geq u$ for all
$t>0$. Indeed, define $\tau =\inf\{t>0,u^{t} \geq u \text{in
$\mathbb{R}^{n}\}$}$. By continuity, we see that $u^{\tau}\geq u$ in
$\mathbb{R}^{n}$. Let us now argue by contradiction and suppose that $\tau
>0$. Two cases may occur.

\noindent\textbf{Case 1.} Suppose that
\begin{equation}
\inf_{\mathbb{R}^{n-1}\times [-a,a]}(u^{\tau}-u)>0.
\end{equation}
 From standard elliptic estimates, $u$ is globally
Lipschitz-continuous. Hence, there exists a real $\eta_{0}$ small
enough, which can be chosen smaller than $\tau$, such that for all
$\tau \geq t>t-\eta_{0}$, we have
$$
u^{t}(x',x_{n})-u(x',x_{n})>0 \quad \text{for all $x'\in \mathbb{R}^{n-1}$
and $x_{n}\in [-a,a]$}
$$
Since $u\geq 1-\delta$ in $\mathbb{R}^{n-1}\times [a,+\infty)$ it follows
that
$$
u^{t}(x',x_{n})-u(x',x_{n})>0 \quad \text{for all $x'\in \mathbb{R}^{n-1}$
and $x_{n}\in [-a,a]$}.
$$
We may now apply Theorem 2.6 in the two half-space
$\Omega^{+}=\{x_{n}>a\}$ and $\Omega^{-}=\{x_{n}<-a\}$. We then
infer that, for all $\eta \in [0,\eta_{0}]$,
$u^{\tau-\eta}(x',x_{n})\geq u(x',x_{n})$ for all $x'\in \mathbb{R}^{n-1}$
and for all $x_{n}\in(-\infty,-a)\bigcup (a,+\infty)$ and so for
all $x_{n}\in R$ owing to (5.2). This is contradiction with the
minimality of $\tau$. Hence (5.5) is ruled out.

\noindent\textbf{Case 2.} Suppose
\begin{equation}
\inf_{\mathbb{R}^{n-1}\times [-a,a]}(u^{\tau}-u)=0.
\end{equation}
Then there exists a sequence $x^{k}_{k\in N}\in \mathbb{R}^{n-1}\times
[-a,a]$ such that $u^{\tau}(x^{k})-u(x^{k})\rightarrow 0$ as
$k\rightarrow +\infty$. We normalize $u$ by translation on $\mathbb{R}^{n}$
by setting $u_{k}(x)=u(x+x_{k})$. Then by standard elliptic
estimate we may assume that $u_{k}$ converges to a solution
$u_{\infty}$ of (5.1) as $k \rightarrow \infty$. We have
$u^{\tau}_{\infty}(0)=u_{\infty}(0)$ and $u^{\tau}_{\infty}\geq
u_{\infty}$ because $u^{\tau}_{k}\geq u_{k}$ for any $k\in N$. We
have
\begin{gather*}
 \Delta_{p}u^({\tau}_{\infty})+f(u^{\tau}_{\infty})=\Delta_{p}u_{\infty}+f(u_{\infty}) \quad \text{in $\mathbb{R}^{n}$} \\
u^{\tau}_{\infty}\geq u_{\infty}   \quad \text{in $\mathbb{R}^{n}$} \\
u^{\tau}_{\infty}(0)=u_{\infty}(0)
\end{gather*}
Strong Comparison Principle yields $u^{\tau}_{\infty}(x)\equiv
u_{\infty}(x)$. This means that $u_{\infty}(x)\equiv
u_{\infty}(x+\tau v)$. Letting $\xi=\tau v$, we see that
$u_{\infty}$ is periodic with respect to the vector $\xi$.
Recalling that $-a \leq x^{k}_{n}\leq a$, we see that the function
$u_{\infty}$ also satisfies the uniform limiting conditions (5.2).
hence, since $\xi _{n}>0$, the function $u_{\infty}$ cannot be
$\xi -periodic$. So Case 2 is also ruled out.


 Therefore, we have proved that $\tau =0$. the function $u$ is
then increasing in any direction$v=(v_{1},\dots,v_{n})$ such that
$v_{n}>0$. From the continuity of $\nabla u$, we deduce that
$\partial_{v}u\geq 0$ for any $v$ such that $v_{n}=0$. If
$v_{n}=0$,by taking $v$ and $-v$, we find that $\partial_{v}u=0$.
Since this is true for all $v$ with $v_{n}=0$. Since this is true
for all $v$ with $v_{n}=0$, this implies that $u(x)=u(x_{n})$.

 Since the solutions of (5.1) are unique up to translations,it
then follows that the solutions $u$ of (5.1), (5.2) such that
$|u|\leq 1$ are unique up to translations of the origin. The proof
is complete.
\end{proof}

\begin{lem}
Let $f$ be a Lipschitz continuous function which is
positive over (0,1), and satisfies $f(1)=0,f(t)\geq \delta_{0}t$
on $(0,t_{0})$ for some small $\delta_{0}>0$ and $t_{0}>0$. If $u$
is $C^{2}$ on the half plane $\Sigma_{M}:=\{x\in \mathbb{R}^{n}:x_{n}>M\}$
and satisfies
$$
\Delta_{p}u+f(u)\leq 0,0<u\leq 1 \text{on $\Sigma_{M}$}
$$
then $u(x',x_{n})\rightarrow 1$ uniformly in $x'\in \mathbb{R}^{n-1}$ as
$x_{n}\rightarrow +\infty$
\end{lem}


 To prove this lemma, we need following lemmas.

\begin{lem}
Let $u$ be a positive function in some domain (open connected
set) $D$ satisfying
$$
\Delta_{p}u+f(u)\leq 0 \quad \text{in $D$}
$$
with $f$ locally Lipschitz continuous. Let $B$ be a ball with
closure $\overline{B}$ in $D$, and suppose $z$ is a function in
$C(\overline{B})$ satisfying
\begin{gather*}
z\leq u \quad \text{in $B$} \\
\Delta_{p}z+f(z)\geq 0 \quad \text{wherever $z>0$ in B} \\
z\leq 0 \quad \text{on $\partial B$}
\end{gather*}
Then, for any continuous one-parameter family of Euclidean
motions(i.e., translations and rotations) $A(t)$ for $0\leq t\leq
T$ with $A(0)=Id$ and $A(t)\overline{B}\subset D,\forall t$, we
have for all $t\in [0,t]$:
\begin{equation}
z_{t}(x):=z(A(t)^{-1}x)<u(x) \text{in $B_{t}:=A(t)B$}
\end{equation}
\end{lem}

\begin{proof}
For all  $t\geq 0,z_{t}$ we have
\begin{gather*}
\Delta_{p}z(t)+f(z(t))\geq 0 \quad \text{wherever $z_{t}>0$ in
$B_{t}$} \\
z_{t} \leq 0 \quad \text{on $\partial B$}
\end{gather*}
Thus in $B_{t},z(t),z$ satisfies $\Delta_{p}z_{t}+f(z_{t})\geq
\Delta_{p}z+f(z) $ wherever $z_{t}>0$ in $B_{t}$ and
\begin{equation}
z_{t}<u \quad \text{on $\partial B_{t}$}
\end{equation}
Since $z_{0}\leq u$ in B, it follows by the comparison principle
that $z_{0}<u$ in $B$.

To prove (5.7) we argue by contradiction. Suppose there is a first
$t$ such that the graph of $z_{t}$ touches that of $u$ in $B_{t}$
at some point $x_{0}$. Then, for that $t$, $z_{t}\leq u$ in
$B_{t},z_{t}(x_{0})=u(x_{0})$. The strong comparison principle
implies that $z_{t}\equiv u$ in $G$ where $G$ is the component
containing $x_{0}$ of the set of points in $B_{t}$ where
$z_{t}>0$. Consequently, by (5.8), any $\tilde{x}\in \partial G$
lies in $B_{t}$. Hence $z_{t}(\tilde{x})>0$ and $z_{t}(x)>0$ for
$x$ near $\tilde{x}$, which shows that $\tilde{x}\in G$. We have
reached a contradiction. Hence, for all $t\in [0,T]$, the graph of
$z_{t}$ always lies below that of $u$ in $B_{t}$.
\end{proof}

\begin{lem}
There exist $\epsilon_{1},R_{0}>0$ with $R_{0}$ depending
only on $n$ and $\delta_{0}$ of Lemma 5.2 such that
$$
u(x)>\epsilon_{1} \quad \text{if $\mathop{\rm dist}(x,\Gamma)>R_{0}$}
$$
\end{lem}

\begin{proof}
 Let $B_{R_{0}}$ be a ball with $R_{0}$ so large that the principal
eigenvalue $\lambda_{1}=\lambda_{1}(B_{R_{0}})$ of $\Delta_{p}$ in
$B_{R_{0}}$ under Dirichlet boundary conditions satisfies
$$
\lambda_{1}=\lambda_{1}(B_{R_{0}})<\delta_{0}.
$$
Let $\varphi_{1}$ be the eigenfunction of $-\Delta_{p}$ in
$B_{R_{0}}$, i.e.,
\begin{gather*}
\varphi_{1}>0, -\Delta_{p}\varphi_{1}=\lambda_{1}\varphi_{1}^{p-1}
\quad \text{in
$B_{R_{0}}$} \\
\varphi_{1}=0 \quad \text{on $\partial B_{R_{0}}$}
\end{gather*}
with $\max\varphi_{1}=1$. then for $0<\epsilon \leq s_{0}$ the
function $z=\epsilon \varphi_{1}$ is a subsolution of our
equation, i.e.,
\begin{gather*}
\Delta_{p}z+f(z)\geq 0 \quad \text{in $B_{R_{0}}$} \\
z=0 \quad \text{on $\partial B_{R_{0}}$}
\end{gather*}
Let us choose $a=(0,a_{n})$ with $a_{n}$ large enough so that
$\overline{B_{R_{0}}(a)}$ lies in $\Omega$. For $B=B_{R_{0}}(a)$,
set
$\epsilon_{0}=\min_{\bar{B}}u$ (clearly $\epsilon_{0}>0$),
and set $\epsilon_{1}=\min(\epsilon_{0},s_{0})$. Since
$\max_{\bar{B}}\varphi_{1}=1$, it follows that
$$
\epsilon_{1}\varphi_{1}(x-a)\leq u(x) \quad \text{in $B_{R_{0}}(a)$}.
$$
In view of Lemma 5.3, we find then that $\forall y \in \Omega$ with
$\mathop{\rm dist}(y,\Gamma)>R_{0}$
$$
\epsilon_{1}\varphi_{1}(x-a)<u(x) \quad \text{in $B_{R_{0}}(y)$}.
$$
In particular, we have $u(y)>\epsilon_{1}$, thereby proving
Lemma 5.4
\end{proof}

Using Lemma 5.4, we prove a result that implies Lemma 5.2

\begin{lem}
Let $y$ be a point with $dist(y,\Gamma)>R_{0}$. By
Lemma 5.4, $\epsilon_{1}\leq u(y)$. Set
$$
\delta=\delta(y)=\min\{ f(s):s\in [\epsilon_{1},u(y)]\}
$$
There is a constant $C_{1}$ depending only on $n$ such that
\begin{equation}
C_{1}\delta \leq [\mathop{\rm dist}(y,\Gamma)-R_{0}]^{-2}
\end{equation}
\end{lem}

\begin{proof}
 We first choose $C_{1}$. Let $v$ be the solution in
$B_{1}(0)$ of
\begin{gather*}
\Delta_{p}v=-1 \quad \text{in $B_{1}(0)$} \\
v=0 \quad \text{on $\partial B_{1}(0)$}
\end{gather*}
We take $C_{1}=\max_{B_{1}(0)}v=v(x_{0})$.
 We assume that (5.9) does not hold and argue by
contradiction;i.e., we assume
$$
C_{1}\delta > [\mathop{\rm dist}(y,\Gamma)-R_{0}]^{-2}
$$
Fix $R<\mathop{\rm dist}(y,\Gamma)-R_{0}$ such that $C_{1}\delta > \mathbb{R}^{-1}$.
Since $\Delta_{p}u<0$ at $y,u$ cannot achieve a local minimum
there. choose a point $y_{1}$ close to $y$ with $u(y_{1})<u(y)$
and such that $\mathop{\rm dist}(y_{1},\Gamma)>R_{0}+R$. By Lemma 5.4,
$u\geq \epsilon_{1}$ in $B_{R}(y_{1})=:B$.

 Let $z$ be the solution in $B$ of
\begin{equation}
\begin{gathered}
\Delta_{p}z=-\delta \quad \text{in $B$} \\
z=0 \quad \text{on $\partial B$}
\end{gathered}
\end{equation}
By scaling, one finds that
$$
\max z=z(y_{1})=C_{1}\delta \mathbb{R}^{2}
$$
For $0<\tau$ small, $\tau z<u$ in $B$. As we increase $\tau$,
there is necessarily a first value-which we call $\tau$-for which
the graph of $\tau z$ touches that of $u$ at some point $x_{0}$.
Since $z=0$ on $\partial B$, $x_{0}$ in $B$. Now
\begin{equation}
u(x_{0})=\tau z(x_{0})\leq \tau z(y_{1})=\tau C_{1} \delta
\mathbb{R}^{2}\leq u(y_{1})<u(y)<1
\end{equation}
and hence $\tau <1$. Thus
\begin{equation}
w:=\tau z-u\geq 0 \text{in $B$},w(x_{0})=\tau z(x_{0})-u(x_{0})=0
\end{equation}
By (5.10), $u(x_{0})<u(y)$, and so in a neighborhood, say $N$, of
$x_{0},u<u(y)$. By the definition of $\delta$, it follows that
$\Delta_{p}\leq -\delta$ in the neighborhood $N$, and since
$\tau <1, \Delta_{p}(\tau z)>\Delta_{p}u>0$ in this neighborhood $N$.
this contradicts the fact that $\tau z-u$ has a local maximum at
$x_{0}$
\end{proof}

\begin{proof}[Proof of Lemma 5.2]
Since  $\mathop{\rm dist}(x,\Gamma)\rightarrow \infty$,
 from (5.9) follows that $\min_{[\epsilon_{1},u(x)]}f \rightarrow 0$
which implies that $u(x)\rightarrow 1$ uniformly in $\Omega$
\end{proof}

\section{Odd Nonlinearity and Related Results}\label{ev6}

In this section, we prove a generalization of Theorem 1.3.

\begin{thm}
Suppose $f$ is Lipschitz continuous and satisfies
$$
f(-1)=f(0)=f(1)=0,\quad tf(t)>0 \quad \text{when $0<|t|<1$},
$$
and for small positive constants $\delta_{0},t_{0}$ and $\delta$
\begin{gather*}
\frac{f(t)}{t}\geq \delta_{0} \quad \text{when $0<|t|<t_{0}$}\\
\quad \text{$f$ is non-increasing on $[-1,-1+\delta]\cup
[1-\delta,1]$}.
\end{gather*}
Furthermore, assume that $f(t)$ is odd in $t$. Then the statement
in Theorem 1.3 holds for any solution $u\in C^{2}(\mathbb{R}^{n})$ of
(5.1), (5.2), (5.3) satisfying $|u|\leq 1$
\end{thm}

\begin{proof}
After a rotation and a translation, we may assume that
the hyperplane is given by $x_{n}=0,u(0)=0$ and $u^{-1}(0)\subset
\{ x:x_{n}\leq 0 \}$. We may assume that $u(x',x_{n})>0,\forall
x'\in \mathbb{R}^{n-1},\forall x_{n}>0$; the other possibility that
$u(x',x_{n})<0,\forall x^{'} \in \mathbb{R}^{n-1},\forall x_{n}>0$ can be
handled analogously.

 For $\tau \geq 0$, let us define
$$
u_{\tau}(x',x_{n})=-u(x',2\tau -x_{n}).
$$
Since $f$ is odd, we easily see that
$$
-\Delta_{p}u_{\tau}=f(u_{\tau})
$$
clearly
$u|_{x_{n}=\tau}\geq 0 \geq u_{\tau}|_{x_{n}=\tau}$.

We want to show that for every $\tau \geq 0$, $u\geq u_{\tau}$ on
the half space$\{ x:x_{n}\geq \tau \}$.
 Since $u(x)>0$ when
$x_{n}>0$, it follows from Lemma 5.2 that
$u(x^{'},x_{n})\rightarrow 1$ as $x_{n}\rightarrow\infty$
uniformly in $x^{'}\in \mathbb{R}^{n-1}$. Therefore, for large $\tau$ we
can apply comparison principle to
$$
\Omega:=\{x:x_{n}>\tau\}
$$
to conclude that $u\geq u_{\tau}$ on $\Omega$. Now define
$$
\tau_{0}=\inf\{\tau \in [0,\infty):u(x{'},x_{n})\geq
u_{\tau}(x^{'},x_{n}), \forall x^{'}\in \mathbb{R}^{n-1}, \forall x_{n}\geq
\tau\}.
$$

\noindent\textbf{Claim:} $\tau_{0}=0$.
Otherwise,$\tau_{0}>0$ and $u(x)\geq
u_{\tau_{0}}(x)$ on the set $\Omega_{0}:=\{x:x_{n}\geq
\tau_{0}\}$. Clearly $u,u_{\tau_{0}}$ satisfied
$$
\Delta_{p}u+f(u)=\Delta_{p}u_{\tau}+f(u_{\tau})
$$
Since $u>0>u_{\tau_{0}}$ on $\partial \Omega_{0}$, by the
definition of $\tau_{0}$,we have two possibilities.
\begin{itemize}
\item[(a)] $u(x_{0})=u_{\tau}(x_{0})$ for
some $x_{0}\in \Omega_{0}$, or

\item[(b)] $u(x)>u_{\tau}(x)>0$ in $\Omega_{0}$ and
$u(z_{k})-u_{\tau}(z_{k})\rightarrow 0$ for some $z_{k}\in
\bar{\Omega}_{0}$ with $|z_{k}|\rightarrow \infty$.
\end{itemize}
 If case(a) occurs, then the Harnack inequality forces $w\equiv
0$ on $\Omega_{0}$, which is impossible as $w>0$ on $\partial
\Omega_{0}$.
 If (b) occurs, we set $u_{k}(x)=u(x+z_{k})$. By
standard elliptic estimates, up to extraction of a subsequence,
$u_{k}$ converges in $C^{2}_{\rm loc}(\mathbb{R}^{n})$ to a solution $u^{*}$
of (5.1) as $k\rightarrow \infty$. Moreover,
$$
v:=u^{*}-u^{*}_{\tau_{0}}
$$
satisfies $v(0)=0$ and
$$
\Delta_{p}u^{*}+f(u^{*})=\Delta_{p}u_{\tau_{0}}^{*}+f(u_{\tau_{0}}^{*}),v\geq
0, \forall x\in \Omega ^{*}
$$
where $\Omega^{*}=\{x:x_{n}>\tau^{*}\}$ with
$\tau^{*}\in[-\infty,0]$ determined by (passing to a subsequence
when necessary)
$$
\tau^{*} =-\lim_{k\rightarrow \infty} d(z_{k},\partial
\Omega_{0}).
$$
If $0\in \Omega^{*}$ then we obtain from the Harnack inequality
that $v\equiv 0$ on $\Omega^{*}$, i.e.,
$$
u^{*}(x^{'},x_{n})=-u^{*}(x{'},2\tau_{0}-x_{n}),\forall x^{'}\in
\mathbb{R}^{n-1},\forall x_{n}>\tau^{*}\,.
$$
Taking $x_{n}=\tau_{0}$ we deduce $u^{*}(x',\tau_{0})=0$. This
implies that ${d(z_{k},\partial \Omega_{0})}$ is bounded, for
otherwise, due to $u(x',x_{n})\rightarrow 1$ uniformly in $x'\in
\mathbb{R}^{n-1}$ as $x_{n}\rightarrow +\infty$, we would have $u^{*}\equiv
1$. The boundedness of $\{d(z_{k},\partial \Omega_{0})\}$ and the
fact that $u(x',x_{n})\rightarrow 1$ uniformly in $x'\in \mathbb{R}^{n-1}$
as $x_{n}\rightarrow +\infty$ imply $u^{*}(x',x_{n})\rightarrow 1$
uniformly in $x'\in \mathbb{R}^{n-1}$ as $x_{n}\rightarrow +\infty$. This
together with comparison principle implies that
$u^{*}(x',x_{n})\rightarrow -1$ uniformly in $x'\in \mathbb{R}^{n-1}$ as
$x_{n}\rightarrow -\infty$. Hence we can use Lemma 5.1 to conclude
that $u^{*}(x)=u^{*}(x_{n})$ and is increasing in $x_{n}$. On the
other hand,since $u_{k}(0)=u(z_{k})>0$, we have $u^{*}(0)\geq 0$,
a contradiction to the monotonicity of $u^{*}(x_{0})$ and
$u^{*}(\tau_{0})=0$


 If $0\in \partial \Omega^{*}$, we necessarily
have $\{d(z_{k},\partial \Omega_{0})\}\rightarrow 0$ and hence
$\tau^{*}=0,\Omega^{*}=\{ x:x_{n}>0 \}$. As before,this implies
$u^{*}(x',x_{n})\rightarrow 1$ uniformly in $x'$ as
$x_{n}\rightarrow \infty$. Moreover for any$\eta \geq -\tau_{0}$,
since $u_{k}(x',\eta)=u((x',\eta)+z_{k})\geq 0$ , we deduce
$$
u^{*}(x',\eta)\geq 0,\forall x' \in \mathbb{R}^{n-1}.
$$
In particular,
\begin{equation}
u^{*}(0,x_{n})\geq 0,\forall x_{n}\geq\tau_{0}
\end{equation}
As $v(0)=0$, we have $u^{*}(0)=-u^{*}(0,2\tau_{0})$. Therefore we
necessarily have $u^{*}(0)=u^{*}(0,2\tau_{0})=0$. In view of
(6.1),the function $g(t):=u^{*}(0,t)$ has a local minimum at $t=0$
and at$t=2\tau_{0}$.Therefore,$g'(0)=g'(2\tau_{0})=0$.This implies
that$\partial_{n}v(0)=0$.Since $v$ satisfies
$$
\Delta_{p}u^{*}+f(u^{*})=\Delta_{p}u^{*}_{\tau}+f(u^{*}_{\tau})\geq
0,\forall x\in \Omega^{*},v(0)=0,0\in
\partial \Omega *
$$
an application of the strong comparison principle gives $v\equiv
0$, i.e., $u^{*}(x',x_{n})=-u^{*}(x',2\tau_{0}-x_{n})$ for all
$x'\in \mathbb{R}^{n-1}$ and all $x_{n}\geq 0$. We can now argue as in the
case that $0\in \Omega ^{*}$ to conclude that
$u^{*}(x)=u^{*}(x_{n})$ and is increasing in $x_{n}$. But this is
in contradiction with our earlier observation that
$u^{*}(0)=u^{*}(2\tau_{0})$.This proves our claim.

 From $\tau_{0}=0$ we obtain $u(x^{'},x_{n})\geq
-u(x^{'},-x_{n})$ for all $x^{'}\in \mathbb{R}^{n-1}$and $x_{n}\geq 0$.
Hence we must have $u(x^{'},x_{n})=-u(x^{'},-x_{n})$ for
all$x^{'}\in \mathbb{R}^{n-1}$ and all $x_{n}>0$. Recall that we have
$u(x^{'},x_{n})\rightarrow -1$ uniformly in $x^{'}$ as
$x_{n}\rightarrow -\infty$. Therefore we can use Lemma 5.1 and
conclude. The proof of Theorem 1.3 is complete.
\end{proof}

\subsection*{Acknowledgments}
This is my master thesis at the Tsinghua University. I am very grateful to
my advisor, Professor Li Ma, for his insightful guidance,
substantial support, constructive advice and encouragement.


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\end{document}